Alternative Forms of the Harnack Inequality for Non-Negative Solutions to Certain Degenerate and Singular Parabolic Equations
Articolo
Data di Pubblicazione:
2009
Abstract:
Non-negative solutions to quasi-linear, degenerate or singular parabolic partial differential equations, of p-Laplacian type for p > 2N/(N+1) satisfy Harnack-type estimates in some intrinsic geometry. Some equivalent alternative forms of these Harnack estimates are established,
where the supremum and the infimum of the solutions play symmetric roles, within a properly redefined
intrinsic geometry. Such equivalent forms hold for the non-degenerate case
p=2 following the classical work of Moser, and are shown to hold in the intrinsic geometry of these degenerate
and/or parabolic p.d.e.’s. Some new forms of such an estimate are also established for 1 < p < 2.
where the supremum and the infimum of the solutions play symmetric roles, within a properly redefined
intrinsic geometry. Such equivalent forms hold for the non-degenerate case
p=2 following the classical work of Moser, and are shown to hold in the intrinsic geometry of these degenerate
and/or parabolic p.d.e.’s. Some new forms of such an estimate are also established for 1 < p < 2.
Tipologia CRIS:
1.1 Articolo in rivista
Keywords:
Degenerate; Singular; Harnack inequalities
Elenco autori:
Dibenedetto, Emmanuele; Gianazza, UGO PIETRO; Vespri, Vincenzo
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